Prove the reverse Fatou lemma: If (f)Ro is a sequence in L'(a, bl; R) and if...
3. Let f, g : a, bl → R be functions such that f is integrable, g is continuous. and g(x) >0 for al x E [a, b]. Since both f,g are bounded, let K> 0 be such that f(x)| 〈 K and g(x)-K for all x E la,b] (a) Let η 〉 0 be given. Prove that there is a partition P of a,b] such that for all i (b) Let P be a partition as in (a). Prove...
Let (, A, ) be a measure space. Let fn : 2 -» R* be a sequence of measurable functions. Let g,h : 2 -» R* be a pair of measurable functions such that both are integrable on that a set A E A and g(r) fn(x)h(x), for all E A and nE N. Prove / fn du lim sup A lim inf fn dulim inf lim sup fn du A fn du no0 no0 A noo n+o0 (You may...
1. Let Xn ER be a sequence of real numbers. (a) Prove that if Xn is an increasing sequence bounded above, that is, if for all n, xn < Xn+1 and there exists M E R such that for all n E N, Xn < M, then limny Xn = sup{Xnin EN}. (b) Prove that if Xn is a decreasing sequence bounded below, that is, if for all n, Xn+1 < xn and there exists M ER such that for...
Question 4. For S: B(ro, 0), assume that f: S R" is a function such that f(x) f(y)Plx - y f(0) c and for some pi1 a. Prove that for any x E S f(x) elpilx|< \cl + Pi*o b. Prove that there exists some rı > 0 such that c|< r1 implies f(x) e S for all x E S (Find a particular choice of ri that will work.) Question 4. For S: B(ro, 0), assume that f: S...
(6) Let (, A,i) be a measure space. Let fn : 0 -» R* be a sequence of measurable functions. Let g, h : O -> R* be a pair of measurable functions such that both are integrable on a set A E A and g(x) < fn(x)<h(x), for all E A and ne N. Prove that / lim sup fn du fn dulim sup fn du lim inf fn du lim inf n o0 A n-oo A noo n00...
(6) Let (2,A, /i) be a measure space. Let fn: N -» R* be a sequence of measurable functions. Let g, h : 2 -> R* be a integrable pair of measurable functions such that both are on a set AE A and g(x) < fn(x) < h(x), for all x E A and n e N. Prove that / / fn du lim sup fn d lim sup lim inf fn d< lim inf fn du п00 n oo...
Let (an)nen be a bounded sequence in R. For all n e N define bn = sup{am, On+1, On+2,...}. (You do not have to show that the supremum exists.) (a) Prove that the sequence (bn)nen is a monotone sequence. (b) Prove that the sequence (bn)nen is convergent. (c) Prove or disprove: lim an = lim bre. 100 000
2. Prove the following: Lemma 1. Consider a function f, defined for all positive integers. Suppose that for all u, v with ulv we have f(u) * f(0) = k* f(u), for some constant k. Then f(x) = k * 9(2) for some multiplicative function g. (Here, * indicates ordinary multiplication.) Proof.
3. Prove that for all f e L(T), the following estimate holds sup If(n)l lILL nEz 3. Prove that for all f e L(T), the following estimate holds sup If(n)l lILL nEz
4) Suppose that u e R. Then u is said to be constructible if there exists a sequence F0, FI, . . . , Fk of subfields of R so that F。= Q, u e Fe and [F, :F,-1] = 2 for i = 1, k. (a) Show that V2+V1+ v5 is constructible. b) Show that cos(/9) is not constructible. 4) Suppose that u e R. Then u is said to be constructible if there exists a sequence F0, FI,...